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Dissociation number
In the mathematical discipline of graph theory, a subset of vertices in a graph G is called dissociation if it induces a subgraph with maximum degree 1. The number of vertices in a maximum cardinality dissociation set in G is called the dissociation number of G, denoted by diss(G). The problem of computing diss(G) (dissociation number problem) was firstly studied by Yannakakis. The problem is NP-hard even in the class of bipartite and planar graphs.
An algorithm for computing a 4/3-approximation of the dissociation number in bipartite graphs was published in 2022.
The dissociation number is a special case of the more general Maximum k-dependent Set Problem for k=1. The problem asks for the size of a largest subset S of the vertices of a graph G, so that the induced subgraph G[S] has maximum degree k.
Notes
References
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References
- {{harvnb. Yannakakis. 1981
- {{harvnb. Papadimitriou. Yannakakis. 1982
- {{harvnb. Yannakakis. 1981
- {{harvnb. Hosseinian. Butenko. 2022
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